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# How would you describe the consecutive angles in a parallelogram brainly

### How do you describe any two consecutive angles - Brainl

1. Answer: PARALLELOGRAMS (rectangles, squares, and rhombi):. 1) , parallelogram are congruent. 2) Opposite angles of a parallelogram are congruent. 3) Consecutive angles in a parallelogram are supplementary
2. A parallelogram is a type of quadrilateral which has two parallel sides on each opposite sides which are equal and the opposite angles in a parallelogram are also equal. The consecutive angles of a parallelogram are supplementary meaning that the sum of the consecutive angles in a parallelogram is equal to 180 degrees
3. 1. How do you describe any two opposite angles in a parallelogram? A. They are always congruent B. They are complementary C. They are supplementary D. They are both right angles 2. What can you say about any two consecutive angles in a parallelogram? A. They are always congruent B. They are sometimes complementary C. They are always.

### Which quadrilaterals always have consecutive angles that

• Consecutive angles of a parallelogram Two interior angles of a parallelogram are called the consecutive angles if some side of the parallelogram is the common side of these two angles. Figure 1 shows the parallelogram ABCD. The consecutive angles of the parallelogram ABCD are the angles
• Interior consecutive angles in a parallelogram can be seen in the following image: The pair of consecutive angles for the parallelogram can be named as (∠A,∠D) (∠ A, ∠ D), (∠A,∠B) (∠ A, ∠ B), (∠C,∠D) (∠ C, ∠ D), and (∠C,∠B) (∠ C, ∠ B)
• 2.how do you describe any two opposite angles in a parallelograms? A. They are always congruent B. They are supplementaryC. They are complementary D. They are both right angle3. which of the following is not sofficuent to prove that a quadrilateral is a parallelograms? A. Two pairs of sides are parallel B. Two pairs of opposite sides are.
• let angle a be = 36° angle a + angle b= 180°( adjacent angles are supplementary) 36°+ angle b= 180° angle b= (180-36)°= 144° angle a= angle c= 36° ( opposite angles in a parallelogram are equal ) similarly-angle b= angle d= 144° thank you
• Opposite sides of parallelogram are equal (AB = DC). Opposite angles of parallelogram are equal (D = B). Consecutive angles in a parallelogram are supplementary (A + D = 180°). If one angle is 90 degrees, then all other angles are also 90 degrees. The diagonals of a parallelogram bisect each other in two equal halves
• A parallelogram is a flat 2d shape which has four angles. The opposite interior angles are equal. The angles on the same side of the transversal are supplementary, that means they add up to 180 degrees. Hence, the sum of the interior angles of a parallelogram is 360 degrees
• A parallelogram is a quadrilateral made from two pairs of intersecting parallel lines. There are several rules involving: the angles of a parallelogram. the sides of a parallelogram. the diagonals of a parallelogram. Rule 1: Opposite sides are parallel Read more. Rule 2: Opposite Sides are Congruent Read more

### 1. How do you describe any two opposite angles - Brainl

• Explanation: In a parallelogram, consecutive angles are supplementary (i.e. add to) and opposite angles are congruent (i.e. equal). Using these properties, we can write a system of equations. 1
• In a parallelogram, any two consecutive angles are supplementary, no matter which pair you pick
• Consecutive angles in a parallelogram will always sum to 180 degrees. That makes consecutive angles in a parallelogram supplementary. In the Parallelogram above, angles A & B, B & C, C & D, and D & A are all examples of consecutive angles. 14.3K view
• How do you describe any two opposite angles in a parallelogram? A. They are always congruent. B. They are supplementary. C. They are complementary. D. They are both right angles. 2. What can you say about any two consecutive angles in a parallelogram? A. Two consecutive angles of a parallelogram have measures (x + 30)° and [2(x - 30)]°..
• A parallelogram has four sides and four angles. Sometimes the sides and angles may be equal while sometimes they may be different. The difference in sides and angles gives the final shape a different name. For example Square, rectangle, rhombus etc

(-2,-1),(1,0),(4,3) are three successive vertices of a parallelogram find the fourth vertex find the answer - 2018190 Consecutive Interior Angles. When two lines are crossed by another line (called the Transversal ): The pairs of angles on one side of the transversal but inside the two lines are called Consecutive Interior Angles. To help you remember: the angle pairs are Consecutive (they follow each other), and they are on the Interior of the two crossed lines

of the items that you were not able to answer correctly and look for the right answer as you go through this module. 1. How do you describe any two opposite angles in a parallelogram? a. They are always congruent. b. They are supplementary. c. They are complementary. d. They are both right angles. 2 Consecutive Angles Are Supplementary To find another one of the properties of parallelograms, draw an imaginary line through the shape to cut it in half. Then, look at the consecutive angles (or the ones that are next to each other). If the shapes are supplementary, then the shape might be a parallelogram In Euclidean geometry, a parallelogram is a simple (non-self-intersecting) quadrilateral with two pairs of parallel sides. The opposite or facing sides of a parallelogram are of equal length and the opposite angles of a parallelogram are of equal measure. The congruence of opposite sides and opposite angles is a direct consequence of the Euclidean parallel postulate and neither condition can. Time: 1 year Start studying Parallelograms: Always, Sometimes, Never. Choose the statement (s) that are not always true for ANY parallelogram. A statement that is not always true about a parallelogram is that the parallelogram's name is Herb. There is one right angle in a parallelogram and it is not a rectangle

First property of a parallelogram − The opposite angles are equal. The three properties of a parallelogram developed below concern first, the interior angles, secondly, the sides, and thirdly the diagonals. The first property is most easily proven using angle-chasing, but it can also be proven using congruence

### Lesson Consecutive angles of a parallelogra

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### How To Prove a Quadrilateral is a Parallelogram (Step By Step

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• (-2,-1),(1,0),(4,3) are three successive - Brainly
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